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akhil911
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08 Jun 2014, 10:42
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
24% (02:27) correct
76%
(02:31)
wrong
based on 488
sessions
History
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Time
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Not Attempted Yet
4 individuals arrive separately at an orchestra concert with assigned seating tickets for exactly 4 seats in a special section. The first person to arrive loses his ticket stub after entry but remembers the section and sits randomly in one of the 4 seats. After that, each person arrives and takes his or her assigned seat in the section if it is unoccupied, and one of the unoccupied seats at random otherwise. What is the probability that the last person to arrive gets to sit in his assigned seat?
A. 1/4
B. 3/8
C. 1/2
D. 5/8
E. 3/4
A. 1/4
B. 3/8
C. 1/2
D. 5/8
E. 3/4
26 Jun 2014, 06:37
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francoimps
Let us assume that there are a,b,c and d individuals. a is the first one to arrive at concert and d is the last one to arrive at concert.
If a sits on his assigned seat, then b and c will also occupy their assigned seats and d will get to sit on his assigned seat.
Probability of a occupying his assigned seat=1/4
If a doesn't occupy his assigned seat, then b will have to occupy seat of either a or c and c will have to occupy the seat that is not assigned to d from the remaining two.
Probability of happening this event=3/4*2/3*1/2=1/4
Total probability=1/4+1/4=1/2
Ans=C
29 Jun 2014, 20:10
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This difficult probability question requires that you consider each of 4 possible scenarios. For purposes of illustration let's assign people letters and seats numbers and say that A is assigned 1, B is assigned 2, C is assigned 3, and D is assigned 4. Let's break it down into 4 equal buckets of 25% each determined by which seat A picks.
A PICKS 1:
There is a 100% probability that D gets the right seat if Person A picks 1, so this represents overall a 25% favorable probability (1 of the 4 possibilities of the seat A could pick)
A PICKS 2:
If B picks 1, C picks 3, then D gets correct seat.
If B picks 3 and C picks 1, then D gets correct seat.
If B picks 3 and C picks 4, then D gets wrong seat
If B picks 4, C gets 3, then D gets wrong seat
Overall, 2/4 possibilities are favorable so take ½ of 25% (overall 12.5% favorable probability)
A PICKS 3:
B gets 2 and C picks 1, then D gets correct seat.
B gets 2 and C picks 4, then D gets wrong seat.
Overall, ½ possibilities are favorable so take ½ of 25% (12.5% favorable probability)
A PICKS 4:
100% probability that D gets wrong seat (0% favorable probability)
Add all of these up and you will see that the probability of D getting the correct seat is 50%. Correct answer is (C).
A PICKS 1:
There is a 100% probability that D gets the right seat if Person A picks 1, so this represents overall a 25% favorable probability (1 of the 4 possibilities of the seat A could pick)
A PICKS 2:
If B picks 1, C picks 3, then D gets correct seat.
If B picks 3 and C picks 1, then D gets correct seat.
If B picks 3 and C picks 4, then D gets wrong seat
If B picks 4, C gets 3, then D gets wrong seat
Overall, 2/4 possibilities are favorable so take ½ of 25% (overall 12.5% favorable probability)
A PICKS 3:
B gets 2 and C picks 1, then D gets correct seat.
B gets 2 and C picks 4, then D gets wrong seat.
Overall, ½ possibilities are favorable so take ½ of 25% (12.5% favorable probability)
A PICKS 4:
100% probability that D gets wrong seat (0% favorable probability)
Add all of these up and you will see that the probability of D getting the correct seat is 50%. Correct answer is (C).
